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I want to generate a list of all possible combinations of a list of strings (it's actually a list of objects, but for simplicity we'll use strings). I need this list so that I can test every possible combination in a unit test.

So for example if I have a list of:

  var allValues = new List<string>() { "A1", "A2", "A3", "B1", "B2", "C1" }

I need a List<List<string>> with all combinations like:

  A1 A2
  A1 A2 A3
  A1 A2 A3 B1
  A1 A2 A3 B1 B2
  A1 A2 A3 B1 B2 C1
  A1 A3
  A1 A3 B1

A recursive function is probably the way to do it to get all combinations, but it seems harder than I imagined.

Any pointers?

Thank you.

EDIT: two solutions, with or without recursion:

public class CombinationGenerator<T>
    public IEnumerable<List<T>> ProduceWithRecursion(List<T> allValues) 
        for (var i = 0; i < (1 << allValues.Count); i++)
            yield return ConstructSetFromBits(i).Select(n => allValues[n]).ToList();

    private IEnumerable<int> ConstructSetFromBits(int i)
        var n = 0;
        for (; i != 0; i /= 2)
            if ((i & 1) != 0) yield return n;

    public List<List<T>> ProduceWithoutRecursion(List<T> allValues)
        var collection = new List<List<T>>();
        for (int counter = 0; counter < (1 << allValues.Count); ++counter)
            List<T> combination = new List<T>();
            for (int i = 0; i < allValues.Count; ++i)
                if ((counter & (1 << i)) == 0)

            // do something with combination
        return collection;
share|improve this question
I know this isn't quite what you were looking for but Microsoft has this system in beta that will auto generate inputs combinations for you. It is called Pex: research.microsoft.com/en-us/projects/pex –  Christopher Rathermel May 9 '12 at 11:51
A1 A2 == A2 A1 ? –  Royi Namir May 9 '12 at 11:54
Imagine a binary counter. This should get you started. –  Yorye Nathan May 9 '12 at 12:00
A1 A2 == A2 A1, indeed –  L-Three May 9 '12 at 12:12
You don't need recursion: stackoverflow.com/questions/10331229/… –  Henrik May 9 '12 at 12:29

4 Answers 4

up vote 10 down vote accepted

You can make in manually, using the fact that n-bit binary number naturally corresponds to a subset of n-element set.

private IEnumerable<int> constructSetFromBits(int i)
    for (int n = 0; i != 0; i /= 2, n++)
        if ((i & 1) != 0)
            yield return n;

List<string> allValues = new List<string>()
        { "A1", "A2", "A3", "B1", "B2", "C1" };

private IEnumerable<List<string>> produceEnumeration()
    for (int i = 0; i < (1 << allValues.Count); i++)
        yield return
            constructSetFromBits(i).Select(n => allValues[n]).ToList();

public List<List<string>> produceList()
    return produceEnumeration().ToList();
share|improve this answer
Hi, this does not return a List<List<string>>... –  L-Three May 9 '12 at 12:12
@Lud: then you need to omit string.Join :) Just updated. –  Vlad May 9 '12 at 12:14

If you want all variations, have a look at this project to see how it's implemented.


But you can use it since it's open source under CPOL.

For example:

var allValues = new List<string>() { "A1", "A2", "A3", "B1", "B2", "C1" };
List<String> result = new List<String>();
var indices = Enumerable.Range(1, allValues.Count);
foreach (int lowerIndex in indices)
    var partVariations = new Facet.Combinatorics.Variations<String>(allValues, lowerIndex);
    result.AddRange(partVariations.Select(p => String.Join(" ", p)));

var length = result.Count;  // 1956
share|improve this answer

Im pretty sure this is a Cartesian product class of problem, you can find a nice linq example for this here: http://blogs.msdn.com/b/ericlippert/archive/2010/06/28/computing-a-cartesian-product-with-linq.aspx

share|improve this answer
this doesn't return all possible calculations? –  L-Three May 9 '12 at 12:18
Cartesian products are not the same thing as combinations. For example, if you have two sets {a0,a1} and {b0,b1}, the cartesian product of the set would be {(a0,b0), (a0,b1), (a1,b0), (a1,b1)}. On the other hand, the combinations of a set {a,b} are {{}, {a}, {b}, {a,b}}. –  Cupcake Apr 14 '14 at 2:25

Simillar kind of task is achived in the below post:

Listing all permutations of a string/integer

Hope this help.

share|improve this answer
Link-only answers are discouraged on Stack Overflow, because links can break, and the resources that they link to can change. Consider summarizing the relevant parts of the link here instead. –  Cupcake Apr 14 '14 at 2:21
Also, the answer that you linked to is for generating permutations, which are not the same thing as combinations. –  Cupcake Apr 14 '14 at 3:43

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